We study the complexity of the problem of deciding the existence of a spanning subgraph of a given graph, and of that of finding a maximum (weight) such subgraph. We establish some general relations between these problems, and we use these relations to obtain new N P-completeness results for maximum (weight) spanning subgraph problems from analogous results for existence problems and from results in extremal graph theory. On the positive side, we provide a decomposition method for the maximum (weight) spanning chordal subgraph problem that can be used, e.g., to obtain a linear (or O (n log n)) time algorithm for such problems in graphs with vertex degree bounded by 3. © 2009 Elsevier B.V. All rights reserved
Given a positive integer k, the “ {k} -packing function problem” ({k} PF) is to find in a given grap...
We prove that the NP-hard problem of finding in an undirected graph G a spanning tree with a maximum...
We prove that the problem of finding, in an undirected graph with non-negative costs on edges, a min...
AbstractWe study the complexity of the problem of deciding the existence of a spanning subgraph of a...
AbstractAn algorithm for finding maximal chordal subgraphs is developed that has worst-case time com...
AbstractWe study here a problem on graphs that involves finding a subgraph of maximum node weights s...
J. Inform. Processing 13, 442-448, 1990This is a survey on complexity issues of subgraph problems pr...
AbstractIn this paper we study the complexity of finding a spanning cactus in various graphs. First,...
Let P be a property of undirected graphs. We consider the following problem: given a graph G that ha...
: We consider the problem of constructing a spanning tree for a graph G = (V, E) with n vertices an...
The complexity of the SIMPLE MAXCUT problem is investigated for several special classes of graphs. I...
In this thesis, we investigate a number of problems related to spanning substructures of graphs. The...
The notion of h-hypertree was defined in [Tomescu 1986] in order to improve the Bonferroni inequalit...
AbstractWe show that testing if an undirected graph contains a bridgeless spanning cactus is NP-hard...
We prove that in a graph with n vertices, induced chordal and interval subgraphs with the maximum nu...
Given a positive integer k, the “ {k} -packing function problem” ({k} PF) is to find in a given grap...
We prove that the NP-hard problem of finding in an undirected graph G a spanning tree with a maximum...
We prove that the problem of finding, in an undirected graph with non-negative costs on edges, a min...
AbstractWe study the complexity of the problem of deciding the existence of a spanning subgraph of a...
AbstractAn algorithm for finding maximal chordal subgraphs is developed that has worst-case time com...
AbstractWe study here a problem on graphs that involves finding a subgraph of maximum node weights s...
J. Inform. Processing 13, 442-448, 1990This is a survey on complexity issues of subgraph problems pr...
AbstractIn this paper we study the complexity of finding a spanning cactus in various graphs. First,...
Let P be a property of undirected graphs. We consider the following problem: given a graph G that ha...
: We consider the problem of constructing a spanning tree for a graph G = (V, E) with n vertices an...
The complexity of the SIMPLE MAXCUT problem is investigated for several special classes of graphs. I...
In this thesis, we investigate a number of problems related to spanning substructures of graphs. The...
The notion of h-hypertree was defined in [Tomescu 1986] in order to improve the Bonferroni inequalit...
AbstractWe show that testing if an undirected graph contains a bridgeless spanning cactus is NP-hard...
We prove that in a graph with n vertices, induced chordal and interval subgraphs with the maximum nu...
Given a positive integer k, the “ {k} -packing function problem” ({k} PF) is to find in a given grap...
We prove that the NP-hard problem of finding in an undirected graph G a spanning tree with a maximum...
We prove that the problem of finding, in an undirected graph with non-negative costs on edges, a min...